%5E2-(x%2B2)%5E2%3D6.jpeg "(x-1)^2-(x+2)^2=6")
Solving the Equation (x-1)^2 - (x+2)^2 = 6
This article will guide you through solving the equation (x-1)^2 - (x+2)^2 = 6.
Understanding the Equation
The equation involves squaring binomials and subtracting them. This presents a good opportunity to utilize the difference of squares factorization pattern.
Applying the Difference of Squares Pattern
The difference of squares pattern states: a² - b² = (a+b)(a-b).
Let's apply this pattern to our equation:
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Identify 'a' and 'b':
- a = (x-1)
- b = (x+2)
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Substitute into the pattern:
- (x-1)² - (x+2)² = [(x-1) + (x+2)][(x-1) - (x+2)]
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Simplify the expression:
- [(x-1) + (x+2)][(x-1) - (x+2)] = (2x + 1)(-3)
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Expand the simplified expression:
- (2x + 1)(-3) = -6x - 3
Solving the Equation
Now our equation is simplified to -6x - 3 = 6. Let's solve for x:
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Add 3 to both sides:
- -6x = 9
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Divide both sides by -6:
- x = -3/2
Solution
Therefore, the solution to the equation (x-1)² - (x+2)² = 6 is x = -3/2.
Verification
We can verify our solution by substituting x = -3/2 back into the original equation:
[( -3/2 - 1 )² - ( -3/2 + 2 )²] = [(-5/2)² - (1/2)²] = [25/4 - 1/4] = 6
This confirms that our solution is correct.